Distributional Compatibility for Change of Measures

Abstract

In this paper, we characterize compatibility of distributions and probability measures on a measurable space. For a set of indices J, we say that the tuples of probability measures (Qi)i∈ J and distributions (Fi)i∈ J are compatible if there exists a random variable having distribution Fi under Qi for each i∈ J. We first establish an equivalent condition using conditional expectations for general (possibly uncountable) J. For a finite n, it turns out that compatibility of (Q1,…,Qn) and (F1,…,Fn) depends on the heterogeneity among Q1,…,Qn compared with that among F1,…,Fn. We show that, under an assumption that the measurable space is rich enough, (Q1,…,Qn) and (F1,…,Fn) are compatible if and only if (Q1,…,Qn) dominates (F1,…,Fn) in a notion of heterogeneity order, defined via multivariate convex order between the Radon-Nikodym derivatives of (Q1,…,Qn) and (F1,…,Fn) with respect to some reference measures. We then proceed to generalize our results to stochastic processes, and conclude the paper with an application to portfolio selection problems under multiple constraints.